# Analytic Solutions of the Heat Equation

**Authors:** Vassilis G. Papanicolaou, Eva Kallitsi, and George Smyrlis

arXiv: 1906.02233 · 2019-06-11

## TL;DR

This paper investigates entire solutions of the heat equation, establishing conditions for initial functions, analyzing their growth properties, and deriving differential equations governing the evolution of their zeros.

## Contribution

It provides new characterizations of entire caloric functions, linking their growth, initial conditions, and zero dynamics in the context of the heat equation.

## Key findings

- Necessary and sufficient conditions for initial functions of entire caloric solutions.
- Relations between growth orders and types of solutions in space and time.
- Differential equations describing the evolution of zeros of caloric functions.

## Abstract

Motivated by the recent proof of Newman's conjecture \cite{R-T} we study certain properties of entire caloric functions, namely solutions of the heat equation $\partial_t F = \partial_z^2 F$ which are entire in $z$ and $t$. As a prerequisite, we establish some general properties of the order and type of an entire function. Then, we start our inquiry on entire caloric functions by determining the necessary and sufficient condition for a function $f(z)$ to be the initial condition of an entire solutions of the heat equation and, subsequently, we examine the relation of the $z$-order and $z$-type of an entire caloric function $F(t, z)$, viewed as function of $z$, to its $t$-order and $t$-type respectively, if it is viewed as function of $t$. After that, we shift our attention to the zeros $z_k(t)$ of an entire caloric function $F(t, z)$, viewed as function of $z$. We show that the points $(t, z)$ at which $F(t, z) = \partial_z F(t, z) = 0$ form a discrete set in $\mathbb{C}^2$ and we derive the $t$-evolution equations of the zeros of $F(t, z)$. These are differential equations which hold for all but countably many $t \in \mathbb{C}$.

## Full text

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## References

14 references — full list in the complete paper: https://tomesphere.com/paper/1906.02233/full.md

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Source: https://tomesphere.com/paper/1906.02233