noun a structure consisting of strips of wood or metal crossed and fastened together with square or diamond-shaped gaps left between, used as a screen or fence or as a support for climbing plants
In mathematics, a lattice is a discrete subgroup of a vector space that spans the space with a basis.
In engineering, lattices are used in the design of structures for their strength and lightweight properties.
In computer science, a lattice is a partially ordered set in which every pair of elements has a unique supremum and infimum.
In chemistry, a lattice is a regular arrangement of atoms, ions, or molecules in a crystal structure.
In physics, a lattice is used to represent the arrangement of particles in a crystal structure.
In writing, a lattice structure can refer to the organization of a piece of writing where ideas are interconnected in a grid-like pattern, allowing for a more complex and interconnected narrative.
In psychology, a lattice model can be used to represent the interconnectedness of different psychological theories and concepts, showing how they relate to each other in a structured and organized way.
In architecture, a lattice structure refers to a framework of crossed wooden or metal strips used to support buildings or as a decorative element in design. Lattice structures can provide both structural support and aesthetic appeal to a building.
In mathematics, a lattice is a partially ordered set in which every pair of elements has a unique supremum (least upper bound) and infimum (greatest lower bound). Lattices are used in various mathematical contexts, such as in algebra, number theory, and computer science.