anything which is single in number are singular.
Alexandru Dimca has written: 'Topics on real and complex singularities' -- subject(s): Singularities (Mathematics)
J. W. Bruce has written: 'Curves and singularities' -- subject(s): Curves, Singularities (Mathematics)
J. Seade has written: 'On the topology of isolated singularities in analytic spaces' -- subject(s): Algebraic Geometry, Analytic spaces, Singularities (Mathematics), Topology
Zohar Yosibash has written: 'Singularities in elliptic boundary value problems and elasticity and their connection with failure initiation' -- subject(s): Boundary value problems, Singularities (Mathematics)
Stephen Shing-Toung Yau has written: 'Classification of Jacobian ideals invariant by sl(2, C) actions' -- subject(s): Ideals (Algebra), Lie algebras, Polynomials, Singularities (Mathematics) 'Gorenstein quotient singularities in dimension three' -- subject(s): Finite groups, Invariants, Singularities (Mathematics)
they havent been discovered yet its a theor y
A singularity is a situation in which a certain mass (usually a large mass) is concentrated in ZERO volume, resulting in an infinite density. This can happen, in certain theories, for black holes, and as the initial conditions of the Big Bang. Physicists generally believe that such singularities don't really exist, and that, if singularities to appear in some formula, they represent a failure of the corresponding theory at extreme conditions.
Pericles S. Theocaris has written: 'Singularities at the vertices of bi-wedges' -- subject(s): Singularities (Mathematics), Strains and stresses, Wedges 'Matrix theory of photoelasticity' -- subject(s): Photoelasticity
Both black hole and Big Bang singularities are points of infinite density and mass where known physical laws break down. They are both areas where gravity is extremely strong, leading to intense curvature of spacetime. Additionally, our current understanding of physics is unable to fully describe or predict the behavior of matter and energy within these singularities.
You find the singularities of the expression.
Hampton N. Shirer has written: 'Mathematical structure of the singularities at the transitions between steady states in hydrodynamic systems' -- subject(s): Hydrodynamics, Stability, Bifurcation theory, Catastrophes (Mathematics), Turbulence, Singularities (Mathematics)
It is thought that at the very center of a black hole is a quantum singularity.