FIVB Senior World Rankings

The FIVB Senior World Rankings is a ranking system for men's and women's national teams in volleyball. The teams of the member nations of Fédération Internationale de Volleyball (FIVB), volleyball's world governing body, are ranked based on their game results with the most successful teams being ranked highest. A points system is used, with points being awarded based on the results of all FIVB-recognised full international matches. The rankings are used in international competitions to define the seeded teams and arrange them in pools. Specific procedures for seeding and pooling are established by the FIVB in each competition's formula, but the method usually employed is the serpentine system.

The ranking system has been revamped in 2020, responding to criticism that the preceding calculation method did not effectively reflect the relative strengths of the national teams. The old version of the ranking system was finally used on 31 January 2020.

As of 8 January 2026, the highest ranked team in the men's category is Poland, while in the women's category is Italy.

Previous calculation method

The system of point attribution for the selected FIVB World and Official Competitions below is as follows:

Olympic Games and qualifying tournaments: included for 4 years and points are also granted for the qualification matches, to the best non-qualified teams.
World Championship and qualifying tournaments: included for 4 years and points are also granted for the qualification matches, to the best non-qualified teams.
World Cup: included for 4 years
World Grand Prix: included for 1 year
World League: included for 1 year

Current calculation method

In 2019, FIVB collaborated with Hypercube Business Innovation of the Netherlands to design a new world ranking platform. The previous calculation method had a problem of circularity in the international volleyball calendar: only countries who participated in the major volleyball events could earn ranking points, whilst the number of ranking points of countries also determined the seeding and access to major events. This unfair principle did not contribute to the sporting and commercial quality of volleyball.

On 1 February 2020, the new ranking system was implemented and took into account all results from 1 January 2019 and later. The system is consistently updated to reflect the latest results and performances. The ranking considers the match results from:

Olympic Games and qualifying tournaments
FIVB World Championship
FIVB World Cup
FIVB Nations League and Challenger Cup
Confederations' Championship and qualifying tournaments
Annual Official Continental Confederations' Events
Annual Official Zonal Associations' Events

Notes:

Olympic qualifying tournaments, FIVB World Cup and FIVB Challenger Cup are discontinued tournaments (as of 2025).
Official competitions must feature a minimum of four senior national teams to be eligible for world ranking points.
Matches played in multi-sport events, friendly matches or unofficial competitions are not eligible for world ranking points.
From 2023: Matches from Annual Continental and Zonal Events are not considered for the world ranking if they involve teams that are also participating in the FIVB Volleyball Nations League (VNL) in the same year.
From 2025: Each Continental Confederation may include up to two Annual Continental Events in the world ranking.
From 2025: Each Zonal Association may include one Annual Zonal Event in the world ranking.

The rankings outcome of each match depends on two main factors:

The playing strength of the teams competing.
The actual match performance or final result of the match.

Ranking Procedure

It is based on the zero-sum system, like CONCACAF Ranking Index or FIFA World ranking, where, after each game, points will be added to or subtracted from a team's rating according to the formula:

:<math>S_\text{after} = S_\text{before} + {K(R-E) \over 8} </math>

where:

<math>S_\text{after}</math> – the team's number of World Ranking scores after the game
<math>S_\text{before}</math> – the team's number of World Ranking scores before the game
<math>K</math> – the match weight factor; see below
<math>R</math> – the result of the game depended on match and sets won (3–0, 3–1, 3–2, 2–3, 1–3 or 0–3); see below
<math>E</math> – the expected result of the game has the value between -2 and +2. If the match is completely balanced, the expected result is 0. The bigger the surprise, the more points are transferred; see below for calculation details.

A key principle of the world ranking is that a team winning a match cannot lose ranking points and a team losing a match cannot gain ranking points. Hence, if a team wins a match but the result is lower than expected, with <math>R<E</math>, the team will be rewarded with the minimum ranking points (0.01), i.e.

:<math>S_\text{after} = S_\text{before} + 0.01</math>

The team that lost the match will instead lose the minimum ranking points (0.01), i.e.

:<math>S_\text{after} = S_\text{before} - 0.01</math>

Match weight factor

The match weight factor is set to reflect the prestige of the tournament. In 2025, FIVB changed the match weight factors for some events and introduced ranking points for events organized by zonal associations. In 2026, the match weight factor for zonal events was reduced.

{| class="wikitable" style="text-align: center;"

! rowspan=2 | Event !! colspan=3 | Match weight factor <math>(K)</math>

! 2019–2024

| style="text-align: left;" | Annual Official Zonal Events || – || 30.0 || 20.0

| style="text-align: left;" | Annual Official Continental Events || 10.0 || 30.0 || 30.0

| style="text-align: left;" | Continental Championship qualifying || 17.5 || – || –

| style="text-align: left;" | FIVB Challenger Cup || 20.0 || – || –

| style="text-align: left;" | Olympic Games qualifying / FIVB World Cup || 35.0 || – || –

| style="text-align: left;" | Continental Championship || 35.0 || 40.0 || 40.0

| style="text-align: left;" | FIVB Nations League || 40.0 || 40.0 || 40.0

| style="text-align: left;" | FIVB World Championship/Cup || 45.0 || 50.0 || 50.0

| style="text-align: left;" | Olympic Games || 50.0 || 50.0 || 50.0

Match result

We set the result <math> R=R_n</math>, where <math>n</math> is the index of the actual result (set score)

<math>n=1</math> – A win 3–0
<math>n=2</math> – A win 3–1
<math>n=3</math> – A win 3–2
<math>n=4</math> – A lose 2–3
<math>n=5</math> – A lose 1–3
<math>n=6</math> – A lose 0–3

{| class="wikitable" style="font-size: 100%; text-align: center;"

!Match Result ||<math> R_n</math> ||<math> P_n</math>

|style="text-align: left;"|A win 3–0 ||+2 ||<math> P\text{1}</math>

|style="text-align: left;"|A win 3–1 ||+1.5 ||<math> P\text{2}</math>

|style="text-align: left;"|A win 3–2 ||+1 ||<math> P\text{3}</math>

|style="text-align: left;"|A lose 2–3 ||-1 ||<math> P\text{4}</math>

|style="text-align: left;"|A lose 1–3 ||-1.5 ||<math> P\text{5}</math>

|style="text-align: left;"|A lose 0–3 ||-2 ||<math> P\text{6}</math>

Expected match result

The expected results is then calculated as

where <math>P_n</math> is the probability of the outcome <math>R_n</math> obtained using the following model (known as Ordered probit):

;Team A win 3–0

:<math> P_\text{1} = \Phi(C_\text{1}+\Delta) </math>

;Team A win 3–1

:<math> P_\text{2} = \Phi(C_\text{2}+\Delta) - \Phi(C_\text{1}+\Delta) </math>

;Team A win 3–2

:<math> P_\text{3} = \Phi(C_\text{3}+\Delta) - \Phi(C_\text{2}+\Delta) </math>

;Team A lose 2–3

:<math> P_\text{4} = \Phi(C_\text{4}+\Delta) - \Phi(C_\text{3}+\Delta)</math>

;Team A lose 1–3

:<math> P_\text{5} = \Phi(C_\text{5}+\Delta) - \Phi(C_\text{4}+\Delta) </math>

;Team A lose 0–3

:<math> P_\text{6} = 1- \Phi(C_\text{5}+\Delta) </math>

where <math>\Phi(z)</math> is the Cumulative distribution function of the Normal distribution, and

<math> C_1,\ldots, C_5 </math> are the cut-points

<math>C_1=-1.06</math>
<math>C_2=-0.394</math>
<math>C_3=0</math>
<math>C_4=0.394</math>
<math>C_5=1.06</math>

set so that <math>P_n</math> is the probability of the outcome <math>n</math> between two equal strength opponents (that is when <math>\Delta=0</math>), which is derived from the actual match results of the past decade.

thumb|left|500px|The cut-points in the normal distribution based on head-to-head between two equal strength teams, i.e <math>\Delta=0</math>.

thumb|left|500px|The cut-points in the normal distribution based on head-to-head between two teams after considering a strength difference, i.e <math>\Delta>0</math>.

The parameter <math>\Delta</math> represents the scaled difference of the teams rankings

:<math> \Delta = {8(S_\text{teamA}-S_\text{teamB}) \over 1000} </math>

where:

<math>S_\text{teamA}</math> – the team A's number of World Ranking scores before the game
<math>S_\text{teamB}</math> – the team B's number of World Ranking scores before the game

Examples

Before the match at the FIVB Volleyball World Championship (K = 50), Brazil (Team A) is ranked number 1 with a 415 WR score and Japan (Team B) is ranked number 11 with a 192 WR score.

Historic women's leaders

For historical women's FIVB rankings from September 2005 to present.