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Type of calculus problem
calculus, an initial value problem (IVP) is an ordinary differential equation together with an initial condition which specifies the value of the unknown
Initial_value_problem
Type of problem involving ODEs or PDEs
boundary-value problem is a differential equation subjected to constraints called boundary conditions. A solution to a boundary value problem is a solution
Boundary_value_problem
Boundary-value problem in differential equations
or initial point. Since the parameter s {\displaystyle s} is usually time, Cauchy conditions can also be called initial value conditions or initial value
Cauchy_boundary_condition
Method for solving boundary value problems
boundary value problem by reducing it to an initial value problem. It involves finding solutions to the initial value problem for different initial conditions
Shooting_method
Parameter in differential equations and dynamical systems
or continuous. The problem of determining a system's evolution from initial conditions is referred to as an initial value problem. A linear matrix difference
Initial_condition
Existence and uniqueness of solutions to initial value problems
set of sufficient (but not necessary) conditions under which an initial value problem has a unique solution. It is also known as Picard's existence theorem
Picard–Lindelöf_theorem
Partial differential equation describing the evolution of temperature in a region
given function of x and t. Initial value problem on (−∞,∞) { u t = k u x x ( x , t ) ∈ R × ( 0 , ∞ ) u ( x , 0 ) = g ( x ) Initial condition {\displaystyle
Heat_equation
Type of functional equation (mathematics)
However, this only helps us with first order initial value problems. Suppose we had a linear initial value problem of the nth order: f n ( x ) d n y d x n
Differential_equation
Differential equation important in physics
gauge of electromagnetism. One method to solve the initial-value problem (with the initial values as posed above) is to take advantage of a special property
Wave_equation
Differential equation exhibiting high rate of dissipation
In computational mathematics, a stiff equation is an initial value problem u ˙ = f ( u ) , u ( 0 ) = u 0 , t ∈ [ 0 , T ] , {\displaystyle {\dot {u}}=f(u)\
Stiff_equation
Family of implicit and explicit iterative methods
Runge–Kutta method" or simply as "the Runge–Kutta method". Let an initial value problem be specified as follows: d y d t = f ( t , y ) , y ( t 0 ) = y 0
Runge–Kutta_methods
Method for solving certain nonlinear partial differential equations
transform (or nonlinear Fourier transform) is a method that solves the initial value problem for a nonlinear partial differential equation using mathematical
Inverse_scattering_transform
Numerical problem-solving method
methods for solving initial value problems. This problem, in which an ordinary differential equation is given together with an initial condition, plays a
One-step_method
Mathematical problem
A Riemann problem, named after Bernhard Riemann, is a specific initial value problem composed of a conservation equation together with piecewise constant
Riemann_problem
Proposal in harmonic analysis
equations. In the 1970s and 1980s Jiro Takeuchi was studying the initial value problem associated with a perturbed version of the linear Schrödinger equation
Mizohata–Takeuchi_conjecture
Cosmological fine-tuning problem
cosmologists to question how the initial density came to be so closely fine-tuned to this 'special' value. The problem was first mentioned by Robert Dicke
Flatness_problem
Method for solving partial differential equations
possible to go from solutions of the Cauchy problem (or initial value problem) to solutions of the inhomogeneous problem. Consider, for instance, the example
Duhamel's_principle
Class of ordinary differential equations
value of λ, solving an initial value problem defined by the boundary conditions at one endpoint, say, a, of the interval [a,b], comparing the value this
Sturm–Liouville_theory
Property of differential equations describing physical phenomena
problem satisfies the following properties: It exists; It is unique; Its behavior changes continuously with the auxiliary conditions, such as initial
Well-posed_problem
Theorem regarding the existence of a solution to a differential equation
theorem which guarantees the existence of solutions to certain initial value problems. Peano first published the theorem in 1886 with an incorrect proof
Peano_existence_theorem
Statement on solutions to ordinary differential equations
( t , t 0 , y 0 ) {\displaystyle y(t)=y(t,t_{0},y_{0})} to the initial value problem y ′ ( t ) = f ( t , y ( t ) ) , y ( t 0 ) = y 0 . {\displaystyle
Carathéodory's existence theorem
Carathéodory's_existence_theorem
Class of problems for PDEs
are given on a hypersurface in the domain. A Cauchy problem may involve initial or boundary values. It is named after Augustin-Louis Cauchy. For a partial
Cauchy_problem
solution. To verify this prediction, recall the solution of the initial value problem u t t = u x x + u y y , u ( 0 , x , y ) = p ( x , y ) , u t ( 0
Constraint_counting
Procedure for solving ODEs
methods. The procedure for calculating the numerical solution to the initial value problem: y ′ ( t ) = f ( t , y ( t ) ) , y ( t 0 ) = y 0 , {\displaystyle
Heun's_method
solution that is singular or one for which the initial value problem (also called the Cauchy problem by some authors) fails to have a unique solution
Singular_solution
Type of differential equation
{\displaystyle \psi (t)} which is the solution to the inhomogeneous initial value problem d d t ψ ( t ) = f ( ψ ( t ) , ϕ ( t − τ ) ) , {\displaystyle {\frac
Delay_differential_equation
Exponential representation for differential equations
Given the n × n coefficient matrix A(t), one wishes to solve the initial-value problem associated with the linear ordinary differential equation Y ′ (
Magnus_expansion
Class of second-order linear partial differential equations
\left\{T\right\}.\end{cases}}} Similarly to a final-value problem for a parabolic PDE, an initial-value problem for a backward parabolic PDE is usually not well-posed
Parabolic partial differential equation
Parabolic_partial_differential_equation
Problem in combinatorial optimization
The knapsack problem is the following problem in combinatorial optimization: Given a set of items, each with a weight and a value, determine which items
Knapsack_problem
Differential equation containing derivatives with respect to only one variable
The theorem can be stated simply as follows. For the equation and initial value problem: y ′ = F ( x , y ) , y 0 = y ( x 0 ) {\displaystyle y'=F(x,y)\,
Ordinary differential equation
Ordinary_differential_equation
Mathematical problem solving strategy
boundary value problems. The method divides the interval over which a solution is sought into several smaller intervals, solves an initial value problem in
Direct multiple shooting method
Direct_multiple_shooting_method
Strong form of uniform continuity
which guarantees the existence and uniqueness of the solution to an initial value problem. A special type of Lipschitz continuity, called contraction, is
Lipschitz_continuity
Nondeterministic Newtonian mechanical system
\end{cases}}} Importantly these two are both solutions to the initial value problem: r ¨ = b 2 r , r ( 0 ) = 0 , r ˙ ( 0 ) = 0. {\displaystyle {\ddot
Norton's_dome
Theorem in numerical analysis
linear consistent finite difference method for a well-posed linear initial value problem, the method is convergent if and only if it is stable. The importance
Lax_equivalence_theorem
Mathematical theorem
theorem that can be used to prove uniqueness of a solution to the initial value problem; see the Picard–Lindelöf theorem. It is named for Thomas Hakon Grönwall
Grönwall's_inequality
Methods of calculating definite integrals
problem of evaluating the definite integral F ( x ) = ∫ a x f ( u ) d u {\displaystyle F(x)=\int _{a}^{x}f(u)\,du} can be reduced to an initial value
Numerical_integration
Motion of particles in a fluid
{\boldsymbol {x}}:\mathbb {R} \to \mathbb {R} ^{n}} the solution of the initial value problem x ˙ ( t ) = F ( x ( t ) ) , x ( 0 ) = x 0 . {\displaystyle {\dot
Flow_(mathematics)
Type of partial differential equations
well-posed initial value problem for the first n − 1 {\displaystyle n-1} derivatives.[citation needed] More precisely, the Cauchy problem can be locally
Hyperbolic partial differential equation
Hyperbolic_partial_differential_equation
Existence and uniqueness theorem for certain partial differential equations
analytic partial differential equations associated with Cauchy initial value problems. A special case was proven by Augustin Cauchy (1842), and the full
Cauchy–Kovalevskaya_theorem
(for the waveguide axis) and they can be solved as "initial" value problem. The "initial" value problem does not involve time, rather it is for the spatial
Beam_propagation_method
Method for solving differential equations
6}A_{1}} We can determine A0 and A1 if there are initial conditions, i.e. if we have an initial value problem. So we have A 4 = 1 4 A 2 = ( 1 4 ) ( − 1 2 )
Power series solution of differential equations
Power_series_solution_of_differential_equations
Branch of mathematics
squine functions are also uniquely determined by solving the coupled initial value problem { x ′ ( t ) = − | y ( t ) | p − 1 y ′ ( t ) = | x ( t ) | p − 1
Squigonometry
Chaotic model of atmospheric convection
Saltzman, Barry (1962). "Finite Amplitude Free Convection as an Initial Value Problem—I". Journal of the Atmospheric Sciences. 19 (4): 329–341. Bibcode:1962JAtS
Lorenz_system
Necessary condition for optimality associated with dynamic programming
optimality. The "value" of a decision problem at a certain point in time is written in terms of the payoff from some initial choices and the "value" of the remaining
Bellman_equation
Constant expressing ambiguity from indefinite integrals
coset. In this context, solving an initial value problem is interpreted as lying in the hyperplane given by the initial conditions. Stewart, James (2008)
Constant_of_integration
Physics problem related to laws of motion and gravity
In physics, specifically classical mechanics, the three-body problem is to take the initial positions and velocities (or momenta) of three point masses
Three-body_problem
Dynamical system governed by Hamilton's equations
that it gives important insights into the dynamics, even if the initial value problem cannot be solved analytically. One example is the planetary movement
Hamiltonian_system
Class of numerical methods
initial value problems. This large class of methods from numerical analysis is based on the exact integration of the linear part of the initial value
Exponential_integrator
Procedure for solving differential equations
obtained in this manner, for s going between 0 and t. The homogeneous initial-value problem, representing a small impulse F ( s ) d s {\displaystyle F(s)\,ds}
Variation_of_parameters
Concept that there might be more than one dimension of time
well-posed initial value problem for the ultrahyperbolic equation (a wave equation in more than one time dimension) demonstrates that initial data on a
Multiple_time_dimensions
Mathematical theorem
Kneser, is about the topology of the set of all solutions of an initial value problem with continuous right hand side. Consider an ordinary linear homogeneous
Kneser's theorem (differential equations)
Kneser's_theorem_(differential_equations)
Methods used to find numerical solutions of ordinary differential equations
must then be solved. A first-order differential equation is an Initial value problem (IVP) of the form, where f {\displaystyle f} is a function f : [
Numerical methods for ordinary differential equations
Numerical_methods_for_ordinary_differential_equations
Partial differential equation
Cole-Hopf transformation. With the transformation, the following initial-value problem can now be solved: w t − a Δ w = 0 , w ( 0 , x ) = e − b g ( x )
Cole–Hopf_transformation
Concept in mathematics
specific values for the initial condition, one can add the plot of several solutions % solve the initial value problem symbolically % for different initial conditions
Autonomous system (mathematics)
Autonomous_system_(mathematics)
Approach to finding numerical solutions of ordinary differential equations
in fact, by any other scheme for first-order systems. Given the initial value problem y ′ = y , y ( 0 ) = 1 , {\displaystyle y'=y,\quad y(0)=1,} we would
Euler_method
Differential equations involving stochastic processes
[}|Z|^{2}{\big ]}<+\infty .} Then the stochastic differential equation/initial value problem d X t = μ ( X t , t ) d t + σ ( X t , t ) d B t for t ∈ [ 0 ,
Stochastic differential equation
Stochastic_differential_equation
Numerical method for solving differential equations
coefficient matrices, then the exact solution to the associated initial value problem would be y ( t ) = e ( L 1 + L 2 ) t y 0 {\displaystyle
Strang_splitting
closed, convex set for all t and x. Existence of solutions for the initial value problem d x d t ( t ) ∈ F ( t , x ( t ) ) , x ( t 0 ) = x 0 {\displaystyle
Differential_inclusion
states about the existence and uniqueness of the solution to an initial value problem for the first order explicit ordinary differential equation. This
Chaplygin's Theorem and Method for Solving ODE
Chaplygin's_Theorem_and_Method_for_Solving_ODE
Mathematical concept
=x.} Let y ( t ) {\displaystyle y(t)} denote the solution to the initial value problem y ′ = y , y ( 0 ) = 1 {\displaystyle y'=y,\ y(0)=1} . Applying
Characterizations of the exponential function
Characterizations_of_the_exponential_function
Generalized function whose value is zero everywhere except at zero
functions of x, then a convolution semigroup arises by solving the initial value problem { ∂ ∂ t η ( t , x ) = A η ( t , x ) , t > 0 lim t → 0 + η ( t ,
Dirac_delta_function
Physical law relating heat loss to temperature difference
transfer (SI unit: second − 1 {\displaystyle ^{-1}} ). Solving the initial-value problem using separation of variables gives T ( t ) = T env + ( T ( 0 )
Newton's_law_of_cooling
Computer software bug occurring in 2038
type's maximum value is exceeded, the integer will overflow to its minimum value, which systems will interpret as in the past. The problem resembles the
Year_2038_problem
Generalisation of the exponential integral to non-commutative algebras
integral[broken anchor]. The ordered exponential is unique solution of the initial value problem: d d t OE [ a ] ( t ) = a ( t ) OE [ a ] ( t ) , OE [ a ]
Ordered_exponential
Parallel algorithm from numerical analysis
algorithm from numerical analysis and used for the solution of initial value problems. It was introduced in 2001 by Lions, Maday and Turinici. Since then
Parareal
Class of differential and integral operators
is the solution operator for the initial value problem for the wave operator. Indeed, consider the following problem: 1 c 2 ∂ 2 u ∂ t 2 ( t , x ) = Δ
Fourier_integral_operator
Class of partial differential equations
Weinstein proved that under a nonlocal constraint, the initial value problem is well-posed for initial data given on a codimension-one hypersurface. And later
Ultrahyperbolic_equation
Probability puzzle
The Monty Hall problem is a brain teaser, in the form of a probability puzzle, based nominally on the American television game show Let's Make a Deal
Monty_Hall_problem
Theory of gravity
fixed in such a way that its initial value problem and its equations of motion coincide with the initial value problem and equations of motion of the
Shape_dynamics
Equations characterizing continuous-time Markov processes
{\displaystyle i} , the Kolmogorov forward equations describe an initial-value problem for finding the probabilities of the process, given the quantities
Kolmogorov_equations
Pattern defining an infinite sequence of numbers
encounters a recurrence relation. For example, when solving the initial value problem y ′ ( t ) = f ( t , y ( t ) ) , y ( t 0 ) = y 0 , {\displaystyle
Recurrence_relation
Equation in machine learning
{h} _{\text{in}}} of the neural ODE is obtained by solving the initial value problem d h ( t ) d t = f θ ( h ( t ) , t ) , h ( 0 ) = h in , {\displaystyle
Neural_differential_equation
Non-mainstream theory in physics
John (1993). "Superluminary Universe: A Possible Solution to the Initial Value Problem in Cosmology". International Journal of Modern Physics D. 2 (3):
Variable_speed_of_light
French mathematical physicist (1923–2025)
that the Einstein field equations can be expressed as a well-posed initial-value problem was listed by the journal Classical and Quantum Gravity as one of
Yvonne_Choquet-Bruhat
Belgian mathematician (1954–2018)
solutions for the initial value problem of the Korteweg–De Vries equation. He formulated what became known as the Bourgain slicing problem in high-dimensional
Jean_Bourgain
Celestial orbit whose trajectory is a conic section in the orbital plane
{\displaystyle B={\sqrt[{3}]{A+{\sqrt {A^{2}+1}}}}} This is the "initial value problem" for the differential equation (1) which is a first order equation
Kepler_orbit
Computer model of a physical system that continuously tracks system response
system depends on its initial state. The problem of solving the ODEs for a given initial state is called the initial value problem. In very few cases these
Continuous_simulation
Numerical method for solving ordinary differential equations
based on his earlier unpublished work. A BDF is used to solve the initial value problem y ′ = f ( t , y ) , y ( t 0 ) = y 0 . {\displaystyle y'=f(t,y),\quad
Backward differentiation formula
Backward_differentiation_formula
Class of iterative numerical methods for solving differential equations
methods for ordinary differential equations approximate solutions to initial value problems of the form y ′ = f ( t , y ) , y ( t 0 ) = y 0 . {\displaystyle
Linear_multistep_method
Term in mathematics
that α is a local solution to the ordinary differential equation/initial value problem α ( t 0 ) = p ; α ′ ( t ) = X ( α ( t ) ) . {\displaystyle {\begin{aligned}\alpha
Integral_curve
Estimation problem in physics or engineering
A Fermi problem (or Fermi question, Fermi quiz), also known as an order-of-magnitude problem, is an estimation problem in physics or engineering education
Fermi_problem
The Cauchy problem (sometimes called the initial value problem) is the attempt at finding a solution to a differential equation given initial conditions
Mathematics of general relativity
Mathematics_of_general_relativity
Sub-area of scientific computing for solving General Relativity equations
spacetimes. In the case of dynamical spacetimes, the problem may be divided into the initial value problem and the evolution, each requiring different methods
Numerical_relativity
problem. The integral on the right-hand side as to be intended as a Bochner integral. The problem of finding a solution to the initial value problem d
Abstract differential equation
Abstract_differential_equation
Constraints to computational problems
time-dependent problems and multiphase flows . Transient problems require one more thing i.e., initial conditions where initial values of flow variables
Boundary conditions in fluid dynamics
Boundary_conditions_in_fluid_dynamics
American mathematician
of general relativity (such as the constraint equations in the initial value problem of Einstein equations and existence of Einstein metrics on manifolds)
John_M._Lee
Algorithm in numerical analysis
Runge-Kutta Fehlberg method with phase-lag of order infinity for initial-value problems with oscillating solution". Computers & Mathematics with Applications
Runge–Kutta–Fehlberg_method
Errors arising in numerical integration
{\displaystyle p} if for any sufficiently smooth solution of the initial value problem, the local truncation error is O ( h p + 1 ) {\displaystyle O(h^{p+1})}
Truncation error (numerical integration)
Truncation_error_(numerical_integration)
Let Φ ( t , p ) {\displaystyle \Phi (t,p)} be the solution of the initial value problem x ˙ = f ( x ) , x ( 0 ) = p {\displaystyle {\dot {x}}=f(x),x(0)=p}
Straightening theorem for vector fields
Straightening_theorem_for_vector_fields
Topics referred to by the same term
transform (AKA inverse scattering transform), a method that solves the initial value problem for a nonlinear partial differential equation (PDE) using methods
Nonlinearity_(disambiguation)
Numerical method
PDE problem is well-posed as an initial value (Cauchy) problem in at least one dimension, because ODE and DAE integrators are initial value problem (IVP)
Method_of_lines
Seven mathematical problems with a US$1 million prize for each solution
to each problem. The Clay Mathematics Institute officially designated the title Millennium Problem for the seven unsolved mathematical problems, the Birch
Millennium_Prize_Problems
Algebraic structure
is a Sobolev space. Then the above initial/boundary value problem can be interpreted as an initial value problem for an ordinary differential equation
Semigroup
Nonlinear time delay differential equation
{k}{c}}+f(y_{0})e^{-ct}} where y 0 {\displaystyle y_{0}} is any initial condition for the initial value problem. However, the above model assumes that variations in
Mackey–Glass_equations
Mathematical counting-out question
freed. The problem— given the number of people, starting point, direction, and number to be skipped— is to choose the position in the initial circle to
Josephus_problem
Index of articles associated with the same name
analytic partial differential equations associated with Cauchy initial value problems. Cauchy–Kowalevski–Kashiwara theorem is a wide generalization of
Uniqueness_theorem
Classifications of Lorentzian manifolds
spacetimes the equations in general relativity can be posed as an initial value problem on a Cauchy surface. There is a hierarchy of causality conditions
Causality_conditions
formulae have been widely used for the numerical solution of stiff initial value problems; the advantage of this approach is that here the solution may be
List_of_Runge–Kutta_methods
System of equations in mathematics
Brenan; S. L. Campbell; L. R. Petzold (1996). Numerical Solution of Initial-value Problems in Differential-algebraic Equations. SIAM. pp. 173–177. doi:10.1137/1
Differential-algebraic system of equations
Differential-algebraic_system_of_equations
Method to solve constrained optimization problems
chosen values of the variables). It is named after the mathematician Joseph-Louis Lagrange. The basic idea is to convert a constrained problem into a
Lagrange_multiplier
INITIAL VALUE-PROBLEM
INITIAL VALUE-PROBLEM
Girl/Female
American, British, English, Italian
Of High Value
Girl/Female
Indian
The initial reality
Girl/Female
American, British, English
Of High Value
Girl/Female
Muslim/Islamic
Value Worth
Girl/Female
Arabic, Indian, Muslim, Parsi, Sindhi
Value; Price; Worth
Boy/Male
Arabic, Hindu, Indian, Marathi, Muslim
Powerful; Don; Value
Boy/Male
Hindu, Indian
The Sprout; Initial
Girl/Female
Tamil
The initial reality
Boy/Male
Arabic, Muslim
Destiny; Dignity; Value
Boy/Male
Indian
Value, Price
Boy/Male
Arabic
Value
Boy/Male
Australian, Finnish, Swedish
Value; Worth; Benefit
Girl/Female
Arabic, Muslim
Superiority; Attribute; Value
Boy/Male
Gujarati, Hindu, Indian
Value; Inside Trueness
Boy/Male
Anglo, British, English, Finnish, Swedish
Valley; Usually with a Stream; From the Glen
Surname or Lastname
English
English : topographic name for someone who lived in a valley, Middle English vale (Old French val, from Latin vallis). The surname is now also common in Ireland, where it has been Gaelicized as de Bhál.Galician and Aragonese : topographic name from val ‘valley’, or habitational name from any of the places named with this word.
Girl/Female
Arabic
Value; Price
Boy/Male
Hindu, Indian
Value
Boy/Male
Muslim
Value, Price
Boy/Male
Australian, Finnish
Rule
INITIAL VALUE-PROBLEM
INITIAL VALUE-PROBLEM
Girl/Female
Indian
Flower
Surname or Lastname
English
English : nickname from Middle English popinjay, papejai ‘parrot’ (via Old French papageai from Arabic bab(b)aghÄ). The ending of the English word was altered by folk etymological association with the bird name jay. The nickname was probably acquired by a talkative person or by someone who habitually dressed in bright colors, but occasionally it may have denoted someone who was connected with or who excelled at the medieval sport of tilting or shooting at a wooden parrot (popinjay) on a pole.
Boy/Male
Gujarati, Hindu, Indian
Great Human Being; Best Person
Boy/Male
Spanish
A Saracen governor of Spain.
Biblical
my secret
Girl/Female
Arabic, Muslim
Gracious; Well Mannered
Boy/Male
English
Raven.
Boy/Male
Hindu
Creation
Girl/Female
Tamil
Suhashini | ஸà¯à®¹à®¾à®·à¯€à®¨à¯€
Ever smiling
Boy/Male
Hindu
INITIAL VALUE-PROBLEM
INITIAL VALUE-PROBLEM
INITIAL VALUE-PROBLEM
INITIAL VALUE-PROBLEM
INITIAL VALUE-PROBLEM
a.
Of or pertaining to the beginning; marking the commencement; incipient; commencing; as, the initial symptoms of a disease.
a.
Not prized or valued; being without value.
imp. & p. p.
of Initial
a.
Highly regarded; esteemed; prized; as, a valued contributor; a valued friend.
n.
Precise signification; import; as, the value of a word; the value of a legal instrument
v. t.
To estimate the value, or worth, of; to rate at a certain price; to appraise; to reckon with respect to number, power, importance, etc.
n.
The relative length or duration of a tone or note, answering to quantity in prosody; thus, a quarter note [/] has the value of two eighth notes [/].
v. t.
To put an initial to; to mark with an initial of initials.
imp. & p. p.
of Value
adv.
In an initial or incipient manner or degree; at the beginning.
v. t.
To raise to estimation; to cause to have value, either real or apparent; to enhance in value.
n.
One who values; an appraiser.
p. pr. & vb. n.
of Initial
n.
Value.
v. t.
To be worth; to be equal to in value.
v. i.
Unsettled; unfixed; undetermined; indefinite; ambiguous; as, a vague idea; a vague proposition.
a.
Placed at the beginning; standing at the head, as of a list or series; as, the initial letters of a name.
v. i.
Proceeding from no known authority; unauthenticated; uncertain; flying; as, a vague report.
v. t.
To rate highly; to have in high esteem; to hold in respect and estimation; to appreciate; to prize; as, to value one for his works or his virtues.