BCS405B Graph Theory – vtuease

BCS405B | GRAPH THEORY

Introduction to Graphs: Introduction- Basic definition – Application of graphs – finite, infinite and
bipartite graphs – Incidence and Degree – Isolated vertex, pendant vertex and Null graph. Paths
and circuits – Isomorphism, sub-graphs, walks, paths and circuits, connected graphs, disconnected graphs and components.

Eulerian and Hamiltonian graphs: Euler graphs, Operations on graphs, Hamiltonian paths and circuits, Travelling salesman problem. Directed graphs – types of digraphs, Digraphs and binary relation

Trees – properties, pendant vertex, Distance and centres in a tree – Rooted and binary trees, counting trees, spanning trees. Connectivity Graphs: Vertex Connectivity, Edge Connectivity, Cut set and Cut Vertices, Fundamental circuits.

Planar Graphs: Planar graphs, Kuratowski’s theorem (proof not required), Different representations of planar graphs, Euler’s theorem, Geometric dual. Graph Representations: Matrix representation of graphs-Adjacency matrix, Incidence Matrix, Circuit Matrix, Path Matrix

Graph Colouring: Colouring- Chromatic number, Chromatic polynomial, Matchings, Coverings, Four colour problem and Five colour problem. Greedy colouring algorithm.

BCS405B | Model Question Paper with Solution

Access well‑organized Model Question Paper with step‑by‑step, point‑wise solutions. Each solution is created to save your time, clarify concepts, and help you revise effectively.

BCS405B | Passing Package
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A smart package made for VTU students! Selected important questions prepared to cover exactly what matters in VTU exams. Clear, simple, and quick to revise – perfect for last‑minute preparation and aiming for better marks with confidence.