English

The initial value problem for ordinary differential equations with infinitely many derivatives

Mathematical Physics 2012-09-03 v1 General Relativity and Quantum Cosmology High Energy Physics - Theory math.MP

Abstract

We study existence, uniqueness and regularity of solutions for ordinary differential equations with infinitely many derivatives such as (linearized versions of) nonlocal field equations of motion appearing in particle physics, nonlocal cosmology and string theory. We develop an appropriate Lorentzian functional calculus via Laplace transform which allows us to interpret rigorously an operator of the form f(t)f(\partial_t) on the half line, in which ff is an analytic function. We find the most general solution to the equation f(t)ϕ=J(t)f(\partial_t) \phi = J(t) (t greater or equal to 0) in the space of exponentially bounded functions, and we also analyze in full detail the delicate issue of the initial value problem. In particular, we state conditions under which the solution ϕ\phi admits a finite number of derivatives, and we prove rigorously that if an a priori data directly connected with our Lorentzian calculus is specified, then the initial value problem is well-posed and it requires only a finite number of initial conditions.

Keywords

Cite

@article{arxiv.1208.6314,
  title  = {The initial value problem for ordinary differential equations with infinitely many derivatives},
  author = {Przemyslaw Gorka and Humberto Prado and Enrique G. Reyes},
  journal= {arXiv preprint arXiv:1208.6314},
  year   = {2012}
}

Comments

PACS numbers: 02.30.Uu, 04.50.Kd, 11.10.Lm, 98.80.Jk

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