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چکیده
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In this work, we continue the study of the multiplicity results for generalized Yamabe equations on Riemannian manifolds arising from conformal Riemannian geometry, astrophysics, and in the theories of thermionic emission, isothermal stationary gas sphere, and gas combustion. As applications,we consider theEmden–Fowler equations involving sublinear terms at infinity. In fact, employing two critical point theorems, we guarantee the existence of two and three solutions for our problem (413).
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