In this paper, we consider an equation inspired by linear peridynamics and we establish its connection with the classical wave equation. In particular, given a horizon \delta > 0 accounting for the region of influence around a material point, we prove existence and uniqueness of a solution u\delta and demonstrate the convergence of u\delta to solutions to the classical wave equation as \delta \rightarrow 0. Moreover, we prove that the solutions to the peridynamics model with small frequency initial data are close to solutions to the classical wave equation.
Comparison Between Solutions to the Linear Peridynamics Model and Solutions to the Classical Wave Equation / Coclite, G.M., Dipierro, S., Maddalena, F., Orlando, G., Valdinoci, E.. - In: SIAM JOURNAL ON MATHEMATICAL ANALYSIS. - ISSN 0036-1410. - STAMPA. - 58:3(2026), pp. 3048-3081. [10.1137/24m1701861]
Comparison Between Solutions to the Linear Peridynamics Model and Solutions to the Classical Wave Equation
Coclite, G. M.
;Maddalena, F.;Orlando, G.;
2026
Abstract
In this paper, we consider an equation inspired by linear peridynamics and we establish its connection with the classical wave equation. In particular, given a horizon \delta > 0 accounting for the region of influence around a material point, we prove existence and uniqueness of a solution u\delta and demonstrate the convergence of u\delta to solutions to the classical wave equation as \delta \rightarrow 0. Moreover, we prove that the solutions to the peridynamics model with small frequency initial data are close to solutions to the classical wave equation.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.

